# There are other shape properties scale-rotation invariant except HuMoment?

Which is the difference between WeightedNormalizedMoments, WeightedHuMoments and HuMoments? (http://scikit-image.org/docs/0.6/api/skimage.measure.html)

There are other shape properties scale-rotation invariant except HuMoment? There are example that show me how can i implement them? I find this example in c++ OpenCV(C): calculating moments FROM contour but i prefer working in python

-
There is a very trivial descriptor that is invariant to everything: number of connected components; question solved ? But that is hardly a good descriptor per se, so maybe you want something better than that ? Fourier descriptors can be easily made invariant to scale and rotation, question solved now ? One of the problems with your question is that it actually contains multiple questions, pick one of them to be your question. –  mmgp Jan 18 '13 at 19:21

Moments are always calculated/summed over a local image feature, which needs to be segmented and labelled in the first place. The following formula is valid for the weighted and non-weighted case:

``````m_ji = sum{ array(x, y) * x^j * y^i }
``````

The actual difference between weighted and non-weighted moments in scikit-image (and in general) is the following:

``````non-weighted:  array(x, y) is a binary image
weighted:      array(x, y) is a grey-level image (each point/pixel is weighted by its grey-level)
``````

These moments are only translation-invariant. To make them scale-invariant we need to normalize them with the following formula:

``````nu_ji = mu_ji / m_00^[(i+j)/2 + 1]
``````

Invariance is meant in terms of geometric transformation.

For more information about moments and its applications you can also have a look at the linked references in the `skimage.measure.regionprops` function.

-